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assume there is a grid with some points in it just like in the plot below. Demo My goal is to count the points per box of the grid. And this is my first try.

            for tupel in point_list:
               for i in self.boxvector:
                  if tupel[0] < i:

               for i in self.boxvector:
                  if tupel[1] < i:


It works, but it is slow. Are there to speed it a little up?

I use a variable named boxvector to define the grid. In this example boxvector is: boxvector = [-1., -.5, 0, .5, 1.]. The grid is always quadratic with maxima at -1 and 1. The boxes are represented through farray, which looks like farray = [[0,0,0,0],[0,0,0,0],[0,0,0,0],[0,0,0,0]]. So that there is one value for each box which is incremented every time the algorithm finds a point in the corresponding box. point_list has the form point_list = [(x0,y0),(x1,y1),(x3,y3), ...]

Thank you for your help !

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3 Answers 3

up vote 3 down vote accepted

Seeing as you appear to already be using matplotlib, just use numpy.histogram2d.

As an example:

import numpy as np
import matplotlib.pyplot as plt

t = np.linspace(0, 4*np.pi, 100)
x = np.cos(3 * t)
y = np.sin(t)

gridx = np.linspace(-1, 1, 5)
gridy = np.linspace(-1, 1, 5)

grid, _, _ = np.histogram2d(x, y, bins=[gridx, gridy])

plt.plot(x, y, 'ro')

plt.pcolormesh(gridx, gridy, grid)
plt.plot(x, y, 'ro')


enter image description here

enter image description here

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Thanks for your idea. I works pretty good!! –  MaxPowers Jun 14 '12 at 14:02

You can calculate the position. divide by 0.5 (box size). Since your array starts with 0, but your coords start with -1, adjust by 1 before dividing. You'll have an edge case of 1 ( (1+1)/0.5 == 4) so make sure it won't overflow 3.

Here's an example:

>>> x,y = (0.8, -0.5)
>>> int((x + 1) / 0.5)
>>> int((y + 1) / 0.5)

Just take into account the to get the max result of 3. So:

>>> f_pos = lambda pos: min(int((pos + 1) / 0.5), 3)
>>> f_pos(x)
>>> f_pos(y)

So, bring it to completion:

f_pos = lambda pos: min(int((pos + 1) / 0.5), 3)
for x,y in point_list:
    f_array[f_pos(x)][f_pos(y)] += 1
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See also




Very fast and efficient points inside polygons utilities. You would just have to create the polygons based on the vertices of the grid corners.


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